%---------------------------Aspect Gamma-----------------------------
\section{Aspect Gamma}

This metric compares root-mean-square edge length to volume.
The root-mean-square edge length is
\[
R = \sqrt{\frac{\sum_{i=0}^{5}\normvec{L_i}^2}{6}}
\]
and so, normalizing the metric to a value of 1 for equilateral tetrahedra, we have
\[
q = \frac{R^3\sqrt{2}}{12|V|}.
\]

Note that if  $|V| < DBL\_MIN$, we set $q = DBL\_MAX$.

\tetmetrictable{aspect $\gamma$}%
{$1$}%                  Dimension
{$[1,3]$}%              Acceptable range
{$[1,DBL\_MAX]$}%       Normal range
{$[1,DBL\_MAX]$}%       Full range
{$1$}%                  Equilateral tet
{\cite{par:93}}%        Citation
{v\_tet\_aspect\_gamma}%                            Verdict function name

